具有精确界和三值逻辑的可靠近似数系统

Reeseo Cha, Wonhong Nam, Jin-Young Choi
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引用次数: 0

摘要

许多编程语言提供了保证精确数字和间隔的误差范围的机制。然而,当它们与不可靠的近似值积分时,我们就不能再依赖误差范围了。这种不可靠的误差范围可能会导致程序出现严重的错误,特别是在安全关键系统中,它们会给我们造成巨大的损失,甚至威胁到人类的生命。因此,在本文中,我们提出了一种新的数字系统,可以在保证误差范围的情况下安全地进行算术运算。在数字系统中,精确数字与近似值分开,具有严格保证误差范围的近似值再次与不可靠的数字(如浮点数)分开。我们的数字系统还附带了一个三值逻辑,以适当地处理由于近似而产生的不确定性。在Python中演示了我们的数字系统的原型实现。有了这个模块,我们可以更可靠地对数字进行运算,并对涉及数字的情况做出判断
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Reliable Approximated Number System with Exact Bounds and Three-Valued Logic
Many programming languages provides mechanism to guarantee the error ranges of exact numbers and intervals. However, when they are integrated with unreliable approximated numbers, we cannot rely on the error-ranges anymore. Such unreliable error-ranges may cause serious errors in programs, and especially in safety critical systems they cost us huge amount of money and/or threaten human’s life. Hence, in this paper, we propose a novel number system to safely perform arithmetic operations with guaranteed error ranges. In the number system, exact numbers are separated from approximated numbers, and approximated numbers with strictly guaranteed error-ranges are again separated from unwarranted numbers such as floating-point numbers. A three-valued logic is also shipped with our number system to appropriately deal with uncertainties due to approximations. A prototype implementation of our number system in Python is demonstrated. With this module, we can more reliably execute operations on numbers and make judgments on the conditions involving numbers
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